Moduli Theory of the r-Braid Arrangement

Abstract

We describe a family of hyperplane arrangements depending on a positive integer parameter r, which we refer to as the r-braid arrangements, and which can be viewed as a generalization of the classical braid arrangement. The wonderful compactification of the braid arrangement (with respect to its minimal building set) is well-known to yield the moduli space M0,n, and, in this work, we generalize this result, constructing a moduli space Mrn of certain genus-zero curves with an order-r involution that we identify with the corresponding wonderful compactification of the r-braid arrangement. The resulting space is a variant of the previously studied moduli space Lrn [arXiv:2104.06526], related via a change of weights on the markings.